Title :
Hamiltonian quantized gossip
Author :
Franceschelli, Mauro ; Giua, Alessandro ; Seatzu, Carla
Author_Institution :
Dept. of Electr. & Electron. Eng., Univ. of Cagliari, Cagliari, Italy
Abstract :
The main contribution of this paper is an algorithm to solve the quantized consensus problem over networks represented by Hamiltonian graphs, i.e., graphs containing a Hamiltonian cycle. The algorithm is proved to converge almost surely to a finite set containing the optimal solution. A worst case study of the average convergence time is carried out, thus proving the efficiency of the algorithm with respect to other solutions recently presented in the literature. Moreover, the algorithm has a decentralized stop criterion once the convergence set is reached.
Keywords :
computational complexity; convergence; distributed algorithms; graph theory; network theory (graphs); set theory; Hamiltonian graph network; computational complexity; convergence; decentralized stop criterion; distributed algorithm; finite set; gossip algorithm; quantized consensus problem; Application software; Bandwidth; Control systems; Convergence; Costs; Intelligent control; Load management; Mobile robots; Quantization; Time measurement;
Conference_Titel :
Control Applications, (CCA) & Intelligent Control, (ISIC), 2009 IEEE
Conference_Location :
St. Petersburg
Print_ISBN :
978-1-4244-4601-8
Electronic_ISBN :
978-1-4244-4602-5
DOI :
10.1109/CCA.2009.5281154
